On the determination of yield surfaces in Herschel-Bulkley fluids

Herschel-Bulkley fluids are materials that behave as rigid solids when the local stress tau is lower than a finite yield stress tau(0), and Bow as non linearly viscous fluids for tau > tau(0). The flow domain then is character ized by two distinct areas, tau < tau(0) and tau > tau(0). The surface tau = tau(0) is known as the yield surface. In this paper, by using analytic so lutions for antiplane shear flow in a wedge between two rigid walls, we dis cuss the ability of regularized Herschel-Bulkley models such as the Papanas tasiou, the bi-viscosity and the Bercovier and Engelman models in determini ng the topography of the yield surface. Results are shown for different flo w parameters and compared to the exact solutions. It is concluded that regu larized models with a proper choice of the regularizing parameters can be u sed to both predict the bulk flow and describe the unyielded zones. The Pap anastasiou model predicts well the yield surface, while both the Papanastas iou and the bi-viscosity models predict well the stress field away from tau = tau(0). The Bercovier and Engelman model is equivalent to the Papanastas iou model provided a proper choice of the regularization parameter sis made . It is also demonstrated that in some cases the yield surface can be effec tively recovered using an extrapolation procedure based upon an analytical representation of the solution. (C) 1999 The Society of Rheology. [S0148-60 55(99)02003-9].